Geodesic
Heat kernel asymptotics for real powers of Laplacians
Canadian journal of mathematics, Tome 76 (2024) no. 2, pp. 367-393

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DOI

We describe the small-time heat kernel asymptotics of real powers $\operatorname {\Delta }^r$, $r \in (0,1)$ of a non-negative self-adjoint generalized Laplacian $\operatorname {\Delta }$ acting on the sections of a Hermitian vector bundle $\mathcal {E}$ over a closed oriented manifold M. First, we treat separately the asymptotic on the diagonal of $M \times M$ and in a compact set away from it. Logarithmic terms appear only if n is odd and r is rational with even denominator. We prove the non-triviality of the coefficients appearing in the diagonal asymptotics, and also the non-locality of some of the coefficients. In the special case $r=1/2$, we give a simultaneous formula by proving that the heat kernel of $\operatorname {\Delta }^{1/2}$ is a polyhomogeneous conormal section in $\mathcal {E} \boxtimes \mathcal {E}^* $ on the standard blow-up space $\operatorname {M_{heat}}$ of the diagonal at time $t=0$ inside $[0,\infty )\times M \times M$.
DOI : 10.4153/S0008414X23000068
Mots-clés : Heat kernel asymptotics, fractional powers of Laplacians, blow-up heat space, polyhomogeneous expansions 
Anghel, Cipriana. Heat kernel asymptotics for real powers of Laplacians. Canadian journal of mathematics, Tome 76 (2024) no. 2, pp. 367-393. doi: 10.4153/S0008414X23000068
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     title = {Heat kernel asymptotics for real powers of {Laplacians}},
     journal = {Canadian journal of mathematics},
     pages = {367--393},
     year = {2024},
     volume = {76},
     number = {2},
     doi = {10.4153/S0008414X23000068},
     url = {http://geodesic.mathdoc.fr/articles/10.4153/S0008414X23000068/}
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